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Given a string s of length n, find the longest string t that occurs both forwards and backwards in s. e.g, s = yabcxqcbaz, then return t = abc or t = cba

I am considering using the generalized suffix tree but I think it would take me O(n^2) time.

i = 0 # Initialize the position on the S
j = 0 # Initialize the position on the Sr
n = len(S) # n is the length of the string
maxLengthPos = (0, 0) # Record the maximum length of such substring found so far and its position

# Iterate through every 
for i in range(n):
    for j in range(n):
        maxL, pos = maxLengthPos
        l = LCE(i, j) # The longest common extension which take O(1) time
        if l > maxL:
            maxLength = (l, i)

Can I implement it in O(n) time?

  • You definitely want to use a suffix tree? You can use dynamic programming and it can be done in O(n) time. – erip Nov 29 '15 at 0:20
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You are looking for the longest common substring of s and its reverse. This can indeed be solved using the generalized suffix array or suffix tree of s and reverse(s), in linear time.

There's a conceptionally simpler approach using the suffix automaton of s though. A suffix automaton is a finite automaton that matches exactly the suffixes of a string, and it can be built in linear time. You can find an implementation in C++ in my Github repository. Now you just feed the second string (in this case reverse(s)) into the automaton and record the longest match, which corresponds to the LCS of the two strings.

  • Can you show us the algorithm in your answer? – Brent Washburne Nov 4 '15 at 0:45
  • @BrentWashburne It's non-trivial 60 lines of code, so I don't think I can present it concisely. I will try to give a high-level overview though. – Niklas B. Nov 4 '15 at 11:29
  • While you answered the question (yes, it's possible in linear time), an excellent answer would include a discussion of the algorithm and not just a link. I've seen answers that are much longer than 60 lines, so don't let that be a limitation. – Brent Washburne Nov 4 '15 at 17:19

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